I have a function of two scalar values `x_i`

, `y_j`

. I have a vector of n `x_i`

values, X and n `y_j`

values, e.g.

```
myfunction <- function(x,y) min(x,y)
X <- 1:3
Y <- 2:4
```

I want to fill out the $n$ by $n$ matrix whose elements `(i,j)`

are given by `myfunction(x_i, y_j)`

. There's a lot of ways to do this in `R`

, and I'm curious about their relative performance.

For instance, this seems like a task for `outer`

, but it seems to get confused whether it is passing a vector or scalar to `myfunction`

. First consider:

```
r
outer(X, Y, paste)
```

gives me each of the pairs

```
[,1] [,2] [,3]
[1,] "1 2" "1 3" "1 4"
[2,] "2 2" "2 3" "2 4"
[3,] "3 2" "3 3" "3 4"
```

Looks good. But

```
outer(X, Y, myfunction)
```

throws the error:

```
Error: dims [product 9] do not match the length of object [1]
```

Meanwhile other possible functions seem to behave as I expected with scalars, such as:

```
myfunction <- function(x,y) exp((x-y)^2)
```

which works fine

```
outer(X, Y, myfunction)
[,1] [,2] [,3]
[1,] 2.718282 54.598150 8103.083928
[2,] 1.000000 2.718282 54.598150
[3,] 2.718282 1.000000 2.718282
```

In a few quick numerical experiments, it seems this is slightly faster than `expand.grid`

, and the function call more compact, but I don't seem to understand why some functions appear to work as I anticipate and others do not.

The classic `expand.grid`

solution also requires the function to work with vector arguments, which means a very different thing for my example with `min`

; a different version of the same problem. Is there a way to enforce the fact that the arguments to my function must be scalars rather than vectors?